I'm new at Coq and I'm trying to prove something pretty basic
Lemma eq_if_eq : forall a1 a2, (if beq_nat a1 a2 then a2 else a1) = a1.
I struggled through a solution posted below, but I think there must be a better way. Ideally, I'd like to cleanly case on
beq_nat a1 a2 while putting the case values in the list of hypothesis. Is there a tactic
t such that using
t (beq_nat a1 a2) yields two subcases, one where
beq_nat a1 a2 = true and another where
beq_nat a1 a2 = false? Obviously,
induction is very close but it loses its history.
Here's the proof I struggled through:
Proof. Hint Resolve beq_nat_refl. Hint Resolve beq_nat_eq. Hint Resolve beq_nat_true. Hint Resolve beq_nat_false. intros. compare (beq_nat a1 a2) true. intros. assert (a1 = a2). auto. replace (beq_nat a1 a2) with true. auto. intros. assert (a1 <> a2). apply beq_nat_false. apply not_true_is_false. auto. assert (beq_nat a1 a2 = false). apply not_true_is_false. auto. replace (beq_nat a1 a2) with false. auto. Qed.